学术报告(石磊 2024.9.20)

Solving PDEs on Spheres with Physics-Informed Convolutional Neural Networks

发布人:姚璐 发布日期:2024-09-19
主题
Solving PDEs on Spheres with Physics-Informed Convolutional Neural Networks
活动时间
-
活动地址
新数学楼519
主讲人
石磊 教授(复旦大学)
主持人
杨力华 教授

摘要:Physics-informed neural networks (PINNs) have been demonstrated to be efficient in solving partial differential equations (PDEs) from a variety of experimental perspectives. Some recent studies have also proposed PINN algorithms for PDEs on surfaces, including spheres. However, theoretical understanding of the numerical performance of PINNs, especially PINNs on surfaces or manifolds, is still lacking. In this talk, we establish rigorous analysis of the physics-informed convolutional neural network (PICNN) for solving PDEs on the sphere. By using and improving the latest approximation results of deep convolutional neural networks and spherical harmonic analysis, we prove an upper bound for the approximation error with respect to the Sobolev norm. Subsequently, we integrate this with innovative localization complexity analysis to establish fast convergence rates for PICNN. Our theoretical results are also confirmed and supplemented by our experiments. In light of these findings, we explore potential strategies for circumventing the curse of dimensionality that arises when solving high-dimensional PDEs.